Multiple Positive Solutions for Nonlocal Elliptic Problems Involving the Hardy Potential and Concave-Convex Nonlinearities

Abstract

In this paper, we study the existence and multiplicity of solutions for the following fractional problem involving the Hardy potential and concave-convex nonlinearities: (- )α2u- γ u|x|α= λ f(x) |u|q - 2 u + g(x) |u|p-2u|x|s \ in , with Dirichlet boundary condition u = 0 \ in Rn , where ⊂ Rn is a smooth bounded domain in Rn containing 0 in its interior, and f,g ∈ C() with f+,g+ 0 which may change sign in . We use the variational methods and the Nehari manifold decomposition to prove that this problem has at least two positive solutions for λ sufficiently small. The variational approach requires that 0 < α <2, 0 <s < α <n, 1<q<2<p 2α*(s):= 2(n-s)n-α, and γ < γH(α) , the latter being the best fractional Hardy constant on Rn.